Method of controlling speed of synchronous motor, and method of identifying constant of synchronous motor

ABSTRACT

In sensorless vector control performed through use of a rotation speed of a synchronous motor 6 and the position of a rotor, a positive current is caused to flow to a γ axis on the assumption that a “d” axis serving as a true magnetic axis is out of phase with the γ axis by only an angle of load θe, whereby torque which is proportional to iγ sin θe and directed toward the γ axis arises in the magnetic axis. Accordingly, a deviation between a d-q axis serving as a true magnetic axis and a γ-δ axis serving as a control axis is eliminated. Even if load is exerted on the motor, the γ axis serving as a control axis is constantly aligned with the “d” axis serving as the magnetic axis of the synchronous motor, thereby enabling excellent vector control.

FIELD OF THE INVENTION

The present invention relates to a method of controlling the speed of a synchronous motor, and more specifically, to a method of controlling the speed of a permanent-magnet-type synchronous motor without use of sensors, as well as to a method of identifying a constant of a controller for driving a synchronous motor.

BACKGROUND ART

Conventionally, sensorless vector control of a synchronous motor employs, as inputs, a difference between a stator current converted into a γ-δ coordinate system set on poles of a rotor and a current estimated most recently and a voltage instruction converted into the γ-δ coordinate system, thereby estimating an electric current and induced voltage of the γ-δ coordinate system and the speed of the rotor.

Through use of a γ-axis induced voltage and an angular speed of the rotor, which are estimated by this method, an angle of error between a d-q coordinate and the γ-δ coordinate set on permanent magnets of the rotor is estimated, whereby the position of the rotor is modified.

Vector control of the motor is performed through use of the angular speed and information about the position of the magnetic axis, which are estimated by the above method.

However, the background art technology encounters a problem. Namely, as a synchronous motor rotates at low speed, a voltage induced by the synchronous motor decreases, thereby deteriorating the accuracy of estimation of the magnetic axis. If vector control of the synchronous motor is performed within a low-speed range, the magnetic axis is lost. Accordingly, the synchronous motor can no longer be controlled.

When large torque is exerted on the synchronous motor within a low-speed range, the angle of load becomes excessively wide, and a difference in angle between a control axis and the magnetic axis of the synchronous motor becomes greater. As a result, a smooth shift toward vector control for controlling the synchronous motor while the control axis is aligned with the magnetic axis fails, thereby causing a problem of the synchronous motor no longer being under control.

Accordingly, the present invention is aimed at providing a superior method of estimating the speed of a synchronous motor, which method enables accurate specification of a magnetic axis even within a low-speed range. Particularly, a first object of the present invention is to provide a method of controlling the speed of a synchronous motor, which method enables realization of a favorable shift toward vector control by means of aligning a control axis with a magnetic axis in the event of great torque being exerted on the synchronous motor within a low-speed range.

Noting that a converter for vector control purpose can accurately control the magnitude, frequency, and phase of an output current, there has been proposed a method comprising the steps of supplying a predetermined current to a motor, measuring a current constant of the induced motor with high accuracy on the basis of a motor voltage induced by the current, and setting, on the basis of a result of measurement, a control-operation constant of an induced motor control system (Japanese Patent Application Laid-Open No. 183953/1985).

However, a method of identifying the constant of a synchronous motor has not yet been proposed for a controller for driving the motor. The control constant of the motor has hitherto been set on the basis of a design constant of the motor. The control constant of each motor to be used must be changed, thus involving an element of inconvenience. The disparity between the design value and a real value induces occurrence of an error in control operation, thereby deteriorating the operating performance of the motor. If the control constant of a motor is manually measured through use of a measuring instrument, there arises a problem of consuming time and deteriorating the accuracy of the constant of the motor.

A second object of the present invention is to provide a method of identifying an induced voltage constant and a d-axis inductance of a motor with high accuracy and at high speed.

DISCLOSURE OF THE INVENTION

To achieve the first object, the present invention provides a sensorless control method for use with a synchronous motor which uses a permanent magnet as a rotor, in which the motor is controlled such that a d-q axis set on a magnetic pole of the rotor is aligned with a γ-δ axis assumed to be set on the rotor, the method comprising the steps of:

-   -   detecting stator currents of at least two phases supplied to the         synchronous motor at time k·Ts (where k=0, 1, 2, 3, . . . , and         Ts denotes a sampling time);     -   deriving a γ-axis current iγ(k) and a δ-axis current iδ(k) by         means of converting the stator currents to a γ-δ coordinate         system;     -   constructing a status estimator by means of taking a difference         between the γ-axis current iγ(k) and a γ-axis current         iγ_(est)(k) estimated in a previous control loop as a correction         iγ(k)−iγ_(est)(k), taking a difference between the δ-axis         current iδ(k) and a δ-axis current iδ_(est)(k) estimated in a         previous control loop as a correction iδ(k)−iδ_(est)(k), taking         voltage instructions Vγ*(k) and Vδ*(k) converted into the γ-δ         coordinate system as inputs, and taking γ-axis induced voltage         εγ(k) and a δ-axis induced voltage εδ(k) resulting from rotation         of the rotor of the synchronous motor as disturbances which stem         from a current response when the rotor remains unrotated;     -   estimating currents iγ_(est)(k+1) and iδ_(est)(k+1) and induced         voltages εγ_(est)(k+1) and εδ_(est)(k+1) at time (k+1)·Ts         seconds;     -   determining the sign of speed of the rotor from the sign of the         estimated induced voltage εγ_(est)(k+1);     -   estimating the value of angular speed ω_(rm)(k+1) of the rotor         from the sum of the square of the induced voltage εγ_(est)(k+1)         and the square of the induced voltage εδ_(est)(k+1) as well as         from the determined sign;     -   deriving a δ-axis direction current instruction by means of         feedback control for multiplying a variation between a         synchronous motor speed instruction ω_(rref) and an estimated         speed ω_(rmest)(k+1) by a gain, thereby inducing generation of         rotation torque for the synchronous motor; and     -   taking a γ-axis current instruction as positive, thereby causing         generation of torque for constraining a magnetic axis “d” to the         γ axis.

The present invention also provides a sensorless speed control method for a synchronous motor, comprising the steps of:

-   -   taking a magnetic axis of the synchronous motor as a “d” axis         and taking an axis leading the “d” axis by 90° as a “q” axis;     -   taking a coordinate d-q axis rotating at a synchronous motor         rotation speed ω_(rm) and a specified magnetic axis of the         synchronous electric motor as γ, and taking an axis leading γ by         90° as δ, thereby setting a γ-δ axis rotating at a synchronous         motor rotation instruction speed ω_(rm*);     -   taking a γ-axis direction current instruction iγ* and a δ-axis         direction current instruction iδ* as positive, thereby inducing         torque for constraining a magnetic axis “d” at an angle leading         the γ axis;     -   deriving a δ-axis direction current instruction by means of         feedback control for multiplying, by a gain, a variation between         the synchronous motor rotation instruction speed ω_(rm*) and an         estimated speed ω_(rmest) derived through disturbance         observation, which observation is prepared by a δ-axis current         formula and is taken as a synchronous motor induced voltage         disturbance;     -   adding, to the δ-axis direction current instruction, a variation         angle correction instruction iδθ* derived from an external         observation by way of a proportional integration controller, the         observation being prepared by a γ-axis current formula and being         taken as a synchronous motor induced voltage disturbance; and     -   aligning a γ axis rotating at instruction speed ω_(rm*) with a         real magnetic axis “d.”

According to such a method of controlling the speed of a synchronous motor, provided that a “d” axis serving as a real magnetic axis is out of phase with a γ axis by only an angle of load θe when a d.c. current iγ flows, in a positive direction, to a γ axis serving as an arbitrarily-specified axis, torque proportional to iγ sin θe develops in the “d” axis serving as a magnetic axis so as to head toward the γ axis in a case where no load is exerted on the motor and the angle of load θe is small. As a result, the “d” axis serving as a real magnetic axis undergoes torque which is constantly headed toward a specified γ axis, whereby the γ axis is aligned with a δ axis. By means of causing a γ axis current instruction iγ* to flow in a low-speed range, specification of a magnetic axis in a low-speed range becomes feasible, thereby enabling good vector control.

When the “d” axis serving as a magnetic axis is constrained, a synchronous motor not having a damper winding usually assumes a dumping factor of substantially zero. The “d” axis induces simple harmonic oscillations around the γ axis. Hence, a current instruction derived by means of feeding back an estimated speed is taken as a δ-axis current. Thus, transient vibrations in the “d” axis are dampened. Provided a synchronous motor induced voltage is taken as ε, ε sin θe is estimated from an estimated disturbance εγ_(est) derived by a γ-axis current formula. In a case where the angle of load is small, εγ_(est) assumes a value proportional to the angle of load. Hence, the magnetic axis “d” can be constrained by iγ*. However, since the angle of load becomes great, the magnetic axis “d” cannot be constrained in particularly a low-speed range. Hence, a correction current instruction iδθ* produced by proportional integration of the estimated disturbance εγ_(est) is added to the δ-axis current instruction. A constraint current is caused to flow to the δ axis as a correction current. As a result, a correction current is caused to flow until εγ_(est) assumes a value of 0: that is, the γ axis is aligned with the “d” axis. Consequently, an excessive increase in the angle of load is prevented, thereby enabling the γ axis to be aligned with the “d” axis.

To achieve the second object, the present invention provides a method of identifying a constant of a controller of a synchronous motor which computes the speed of the motor from two-phase current supplied to the motor, the controller including

-   -   a δ-axis speed controller for outputting a δ-axis current         instruction on the basis of a signal relating to a variation         between a speed instruction and the speed of the motor,     -   a δ-axis current controller for computing a δ-axis voltage         instruction from a δ-axis current instruction,     -   a γ-axis current controller for computing a γ-axis voltage         instruction from a γ-axis current instruction,     -   a vector control circuit outputting the absolute value of a         voltage instruction and the phase of the voltage instruction on         the basis of the δ-axis voltage instruction and the γ-axis         voltage instruction, and     -   an inverter circuit for supplying a drive current to the         synchronous motor on the basis of the absolute value of a         voltage instruction and the phase of the voltage instruction,         the method comprising the steps of:     -   setting an α-β space coordinate system which takes a U phase of         a rotor of the motor as an α axis and has a β axis leading from         the α axis by an electric angle of 90° in the direction of         forward rotation;     -   assuming a γ-δ axis rotating at a synchronous motor rotation         instruction speed ω_(rm*) in the α-β space coordinate system         while taking a real magnetic axis of the synchronous motor as a         “d” axis, taking an axis leading 90° from the “d” axis as a “q”         axis, a coordinate d-q axis rotating at a synchronous motor         rotation speed ω_(rm) and a specified magnetic axis of the         synchronous motor as a γ axis, and taking an axis leading the γ         axis by 90° as a δ axis; and     -   adjusting an induced voltage constant such that an estimated         speed ω_(rmest) to which a correction is added so as to become         equal to an estimated speed ω_(rmest′) to which no correction is         added, through use of a synchronous motor induced voltage         e_(dest) prepared by a δ-axis current formula, the formula         taking a γ-δ-axis current and a δ-axis voltage instruction         v_(d*) as inputs and taking a voltage induced in the synchronous         motor as a disturbance, thereby identifying the induced voltage         constant.

Preferably, the method is embodied as software, and the software is installed in an inverter, thereby embodying means for accurately identifying a constant at high speed.

The present invention also provides a method of identifying a constant of a controller of a synchronous motor which computes the speed of the motor from two-phase current supplied to the motor, the controller including

-   -   a δ-axis speed controller for outputting a δ-axis current         instruction on the basis of a signal relating to a variation         between a speed instruction and the speed of the motor,     -   a δ-axis current controller for computing a δ-axis voltage         instruction from a δ-axis current instruction,     -   a γ-axis current controller for computing a γ-axis voltage         instruction from a γ-axis current instruction,     -   a vector control circuit outputting the absolute value of a         voltage instruction and the phase of the voltage instruction on         the basis of the δ-axis voltage instruction and the γ-axis         voltage instruction, and     -   an inverter circuit for supplying a drive current to the         synchronous motor on the basis of the absolute value of a         voltage instruction and the phase of the voltage instruction,         the method comprising the steps of:     -   setting an α-β space coordinate system which takes a U phase of         a rotor of the motor as an α axis and has a β axis leading the α         axis by an electric angle of 90° in the direction of forward         rotation;     -   setting a γ-δ axis rotating at a synchronous motor rotation         instruction speed ω_(rm*) in the α-β space coordinate system         while taking a real magnetic axis of the synchronous motor as a         “d” axis, taking an axis leading 90° the “d” axis as a “q” axis,         a coordinate d-q axis rotating at a synchronous motor rotation         speed ω_(rm) and a specified magnetic axis of the synchronous         motor as a γ axis, and taking an axis leading the γ axis by 90°         as a δ axis;     -   causing several different currents i_(g*) to flow toward the γ         axis through use of an estimated δ-axis induced voltage e_(dest)         and a γ-axis current instruction i_(g*) which are prepared by a         δ-axis current formula, the formula taking a δ-axis direction         current i_(d) and a δ-axis voltage instruction v_(d*) as inputs         and taking a δ-axis induced voltage e_(d) as a disturbance; and     -   adjusting a d-axis inductance such that the estimated δ-axis         induced voltages e_(dest) arising at that time become equal to         each other, thereby identifying the d-axis inductance.

Preferably, the method for identifying d-axis inductance of the synchronous motor is embodied as software, and the software is installed in an inverter, thereby embodying means for accurately identifying a constant at high speed.

BRIEF DESCRIPTION OF THE DRAWINGS

FIG. 1 is a block diagram showing a control system to which a method of controlling the speed of a synchronous motor according to a first embodiment of the present invention.

Reference numerals designate the following elements:

-   1 speed controller -   2 δ-axis current controller -   3 γ-axis current controller -   4 vector control circuit -   5 inverter circuit -   6 synchronous motor -   7 phase converter -   8 γ-δ-axis current/induced voltage estimator -   9 angular-speed deriving section -   10 angle-of-error (θe) deriving section -   11 γ-δ-axis position corrector -   12 γ-phase/δ-phase current corrector -   13 motor-constant identifier

A first embodiment of the present invention will now be described by reference to the drawings.

FIG. 1 is a block diagram showing a control system to which is applied a method of controlling the speed of a synchronous motor according to a first aspect of the present invention.

The first embodiment shown in FIG. 1 is in principle directed toward constructing a sensorless vector control system through use of the rotation speed of a synchronous motor and the position of a rotor estimated according to a method of estimating the speed of a permanent-magnet-type synchronous motor, a method of estimating an angle of error of a rotor of the motor, and a method of correcting the position of the rotor, which are described in Japanese Patent Application Laid-Open No. 191698/1997. However, according to this estimation method, the speed of the synchronous motor and the position of the rotor are estimated from information about an induced voltage. Little information about an induced voltage is available within an estimated low-speed range. Hence, it becomes difficult to correct a discrepancy between a γ-δ axis serving as a control axis and a d-q axis of the synchronous motor, thereby precluding realization of favorable vector control.

At the time of control of the motor within a low-speed region, when a positive current flows to a γ axis, a “d” axis serving as a true magnetic axis is out of phase with the γ axis by only an angle of load. Accordingly, torque—which is proportional to the magnetic axis and directed toward the γ axis—develops. For this reason, the control method described in Japanese Patent Application Laid-Open No. 191698/1997 is improved through use of a method which enables excellent vector control by means of eliminating a deviation between the d-q axis serving as a real magnetic axis and the γ-δ axis serving as a control axis, such that excellent vector control can be ensured over high-speed and low-speed ranges by means of effecting vector control within a high-speed range in accordance with the previously-described example.

As shown in FIG. 1, an angular-speed instruction ω_(rm)* and an estimated angular-speed ω_(rm est) (an estimated angular-speed will be hereinafter represented as “est”) are input to the speed controller 1, and the speed controller 1 outputs a δ-phase current instruction iδ*. The δ-phase current controller 2 receives an estimated δ-phase current iδ_(est2) output from the current corrector and the current instruction iδ* and outputs a δ-phase voltage instruction Vδ*. A positive γ-phase current instruction iγ* and an estimated γ-phase current iγ_(est2) are input to the γ-phase current controller 3. The γ-phase current controller 3 outputs a γ-phase voltage instruction Vγ*. The δ-phase current instruction Vδ*, the γ-phase voltage instruction Vγ*, and the position of the γ-δ axis output from the γ-δ-axis position corrector 11 are input to the vector control circuit 4. The absolute value (Vδ²+Vγ²)^(1/2) of a voltage and a phase tan⁻¹(Vδ/Vγ) from the γ-axis in a direction in which a voltage is output are input to the inverter circuit 5, and a turn-on operation is implemented.

A γ-phase current iγ is produced as a result of a stator current i_(u) of the synchronous motor 6 passing through the phase converter 7. A δ-phase current iδ is produced as a result of a stator current i_(v) passing through the phase converter 7. The γ-phase current iγ, the δ-phase current iδ, the position of the γ-δ axis, and the voltage instructions Vδ* and Vγ* are input to the γ-δ-axis current/induced voltage estimator 8. The γ-δ-axis current/induced voltage estimator 8 outputs estimated γ-δ-phase currents iγ_(est) and iδ_(est) and induced γ-δ-phase voltages εγ_(est) and εδ_(est). The induced γ-δ-phase voltages εγ_(est) and εδ_(est) are input to the angular-speed deriving section 9, where an estimated angular speed ω_(rm est) is derived. The estimated angular speed ω_(rm est) and the induced γ-δ-phase voltages εγ_(est) are input to the angle-of-error θ_(e est) deriving section 10, where an angle of error θ_(e est) between the γ-δ axis and the d-q axis is derived.

The angle of error θ_(e est) is input to the γ-δ axis position corrector 11, thereby correcting the position of the γ-δ axis. As a result, the current corrector 12 corrects an electric current. The motor-constant identifier 13 is an element newly added to the control system in the present embodiment. The motor-constant identifier 13 identifies constants Rs, Lq, and Ld of the synchronous motor, thereby detecting the “d” axis by means of variations in inductance. Further, the motor-constant identifier 13 receives an estimated induced voltage εδ_(est) as an estimated disturbance and estimates an angle of error between the d-q axis and the γ-δ axis from known ε cos θ_(e est). The motor-constant identifier 13 outputs the positive γ-phase current instruction iγ* for causing to flow, to the γ axis, a positive current appropriate to a current to be used for constraining a magnetic axis at low speed.

The operation of the control system will now be described.

In the case of control operation at high speed, at least currents of two phases supplied to the synchronous motor at a point in time k·Ts seconds; for example, i_(u)(k) and i_(v)(k), are detected. The electric currents are converted into the γ-δ-axis coordinate system corrected in a previous loop, by means of the phase converter 7, thereby deriving iγ(k) and iδ(k).

Next, voltage instructions Vγ* and Vδ*, which are converted into the γ-δ coordinate system through use of a status estimator constructed in the inducted voltage estimator 8, and the γ-δ-axis current are input. By means of a known method, there are derived estimated values at time (k+1)·Ts seconds: that is, iγ_(est)(k+1), iδ_(est)(k+1), εγ_(est)(k+1), and εδ_(est)(k+1).

From the sign of the estimated εδ_(est)(k+1), the angular-speed deriving section 9 determines the sign of angular speed. ω_(rm est)(k+1) is derived by means of the thus-determined sign and from the sum of the square of εγ_(est)(k+1) and the square of εδ_(est)(k+1). The angle-of-error θe deriving section 10 determines θ_(e est)(k+1) from εγ_(est)(k+1) and ω_(rm est)(k+1), and the γ-δ-axis position corrector 11 corrects the position of the γ axis. Provided that the γ axis has been subjected to axis conversion by only ρθ_(e est)(k+1), the γ-phase/δ-phase current corrector 12 modifies initial values iγ_(est)(k+1), iδ_(est)(k+1), εγ_(est)(k+1), and εδ_(est)(k+1) at the time of a (k+1) loop.

In the case of control operation within a low-speed range, the motor-constant identifier 13 outputs, to the γ-axis current controller 3, the positive γ-phase current instruction iγ* for flowing, to the γ axis, thereby inducing occurrence of torque in a magnetic pole “d” axis, wherein the torque is proportional to i_(γ)sin θe and directed toward the γ axis. Accordingly, a deviation between the magnetic axis d-q and the control axis γ-δ is eliminated, thereby enabling excellent vector control.

A second embodiment of the present invention will be described by reference to the drawings.

BRIEF DESCRIPTION OF THE DRAWINGS

FIG. 2 is a block diagram showing a control system to which is applied a method of controlling the speed of a synchronous motor according to a second embodiment of the present invention.

FIG. 3 is a flowchart showing the operation of the control system shown in FIG. 2.

Reference numerals designate the following elements:

-   1 speed controller -   2 δ-axis current controller -   3 γ-axis current controller -   4 vector control circuit -   5 inverter circuit -   6 synchronous motor -   7 phase converter -   8 γ-δ-axis current/induced voltage estimator -   9 angular-speed deriving section -   11 γ-δ-axis position corrector -   12 γ-phase/δ-phase current corrector -   13 motor-constant identifier -   14 shaft current instruction corrector

A second embodiment shown in FIG. 2 is directed toward improving control at the time of an increase in load (particularly within a low-speed range). More specifically, if the angle of load θe has become excessively wide as a result of load increasing more than in the previous embodiment, a positive current is caused to flow to the δ axis, thereby dampening transient vibrations in the “d” axis and reducing an angle of load. Further, a magnetic axis is constrained, and a deviation between the magnetic axis d-q and the control axis γ-δ is eliminated.

As shown in FIG. 2, an angular-speed instruction ω_(rm)* and an estimated angular-speed ω_(rm est) are input to the speed controller 1, and the speed controller 1 outputs a δ-phase current instruction iδ*. An estimated induced voltage εγ_(est) is input to the δ-axis current instruction corrector 14 (proportional integration controller) From known ε sin θ_(e est), an angle of error θe is estimated, and a δ-axis corrected current instruction i_(δθ)* appropriate to the angle of error is output. The δ-phase current controller 2 receives an estimated δ-phase current iδ_(est2) output from the current corrector and the current instructions iδ* and iδθ* and outputs a δ-phase voltage instruction Vδ*, thereby dampening transient vibrations in the “d” axis. The positive current iδθ* is caused to flow to the δ axis, thereby pulling and constraining a magnetic axis so as to prevent an excessive increase in the angle of load.

As in the case shown in FIG. 1, a positive γ-phase current instruction iγ* and an estimated γ-phase current iγ_(est2) are input to the γ-phase current controller 3. The γ-phase current controller 3 outputs a γ-phase voltage instruction Vγ*. The δ-phase current instruction Vδ*, the γ-phase voltage instruction Vγ*, and the position of the γ-δ axis output from the γ-δ-axis position corrector 11 are input to the vector control circuit 4. The absolute value (Vδ²+Vγ²)^(1/2) of a voltage and a phase tan⁻¹(Vδ/Vγ) from the γ-axis in a direction in which a voltage is output are input to the inverter circuit 5, and a turn-on operation is implemented.

A γ-phase current iγ is produced as a result of a stator current i_(u) of the synchronous motor 6 passing through the phase converter 7. A δ-phase current iδ is produced as a result of a stator current i_(v) passing through the phase converter 7. The γ-phase current iγ, the δ-phase current iδ, the position of the γ-δ axis, and the voltage instructions Vδ* and Vγ* are input to the γ-δ-axis current/induced voltage estimator 8. By means of known formula (1), the γ-δ-axis current/induced voltage estimator 8 outputs estimated γ-δ-phase currents iγ_(est) and iδ_(est) and induced γ-δ-phase voltages εγ_(est) and εδ_(est). The induced γ-δ-phase voltages εγ_(est) and εδ_(est) are input to the angular-speed deriving section 9, where an estimated angular speed ω_(rm est) is derived by means of formulas (2) and (3). A speed instruction ω_(rm)* is input to the γ-δ-axis position corrector 11, where the position of the γ-δ axis is corrected by means of formula (4). $\begin{matrix} {{\frac{\mathbb{d}}{\mathbb{d}t}\begin{bmatrix} {{\hat{i}}_{y}\left( {k + 1} \right)} \\ {{\hat{i}}_{\delta}\left( {k + 1} \right)} \\ {{\hat{ɛ}}_{Yy}\left( {k + 1} \right)} \\ {{\hat{ɛ}}_{\delta\quad y}\left( {k + 1} \right)} \end{bmatrix}} = {\begin{bmatrix} {1 - {\frac{R_{s}}{L_{d}} \cdot T_{s}}} & {{\frac{L_{q}}{L_{d}} \cdot {\hat{\omega}\quad}_{rm}}{(k) \cdot T_{s}}} & T_{s} & 0 \\ {{- \frac{L_{d}}{L_{q}}}{{{\hat{\omega}}_{rm}(k)} \cdot T_{s}}} & {1 - {\frac{R_{s}}{L_{q}} \cdot T_{s}}} & 0 & T_{5} \\ 0 & 0 & 1 & 0 \\ 0 & 0 & 0 & 1 \end{bmatrix}{\quad{\begin{bmatrix} {{\hat{i}}_{y}(k)} \\ {{\hat{i}}_{\delta}(k)} \\ {{\hat{ɛ}}_{Yy}(k)} \\ {{\hat{ɛ}}_{\delta\quad y}(k)} \end{bmatrix} + {{\quad\quad}{{T_{s}\begin{bmatrix} \frac{1}{L_{d}} & 0 \\ 0 & \frac{1}{L_{q}} \\ 0 & 0 \\ 0 & 0 \end{bmatrix}}\begin{bmatrix} {v_{r}(k)} \\ {v_{\delta}(k)} \end{bmatrix}}} + {{T_{s}\begin{bmatrix} k_{1} & k_{2} \\ k_{3} & k_{4} \\ k_{5} & k_{6} \\ k_{7} & k_{8} \end{bmatrix}}\begin{bmatrix} {{i_{Y}(k)} - {{\hat{i}}_{Y}(k)}} \\ {{i_{\delta}(k)} - {{\hat{i}}_{\delta}(k)}} \end{bmatrix}}}}}} & (1) \end{matrix}$  sin {{overscore (ω)}_(rm)(k+1)}=−sin {{overscore (ε)}_(δ)(k+1)} . . . (2) $\begin{matrix} {{{\hat{\omega}}_{rm}\left( {k + 1} \right)} = {\sin{\left\{ {{\hat{ɛ}}_{\delta}\left( {K + 1} \right)} \right\} \cdot \left\{ {{{\hat{ɛ}}_{\gamma}^{2}\left( {k + 1} \right)} + {{\hat{ɛ}}_{\delta}^{2}\left( {k + 1} \right)}} \right\}^{\frac{1}{2}} \cdot \left( \frac{L}{\phi_{mag}} \right)}}} & (3) \end{matrix}$  ρ*(k+1)=ρ*(k)+ω_(rm)*(k+1)·T _(s)  (4)

The basic braking operation of the control system will now be described by reference to a flowchart shown in FIG. 3.

At least currents of two phases supplied to the synchronous motor at a point in time k·Ts second; for example, i_(u)(k) and i_(v)(k), are detected (step S1). The electric currents are converted into the γ-δ-axis coordinate system corrected in a previous loop, thereby deriving iγ(k) and iδ(k) (step S2). Voltage instructions Yγ(K) and Yδ(K) converted into the γ-δ coordinate system are input (step S3). By means of formula (1), there are derived estimated values at time (k+1)·Ts seconds; that is, iγ_(est)(k+1), iδ_(est)(k+1), εγ_(est)(k+1), and εδ_(est)(k+1) (step S4).

From the sign of the estimated εδ_(est)(k+1), the sign of angular speed is determined (step S5). ω_(rm est)(k+1) is derived from the sum of the square of εγ_(est)(k+1) and the square of εδ_(est)(k+1) by means of the thus-determined sign and formulas (2) and (3) (step S6). The position of the γ axis is corrected by means of formula (4) (step S7).

As mentioned above, if a heavy load is exerted on the motor by means of control within a low-speed range, thereby excessively increasing the angle of load θe, an increase in the angle of load θe is prevented by means of pulling the δ axis through use of iδθ* as well as by means of pulling the “d” axis through use of iγ*. Accordingly, a deviation between the d-q axis and the γ-δ axis is eliminated, and excellent vector control can be effected by means of control according to the flowchart.

Japanese Patent Application Laid-Open No. 174499/1998 describes a method. According to the method, in a case where a rotation speed ω_(R)γ of the γ-δ axis is determined such that control is smoothly switched from a low-speed range to a high-speed range, there are prepared a distribution gain K1 set so as to become smaller as the absolute value of a rotation speed instruction ω_(PREF) increases and a distribution gain K2 set so as to become greater as the absolute value of a rotation speed instruction ω_(PREF) increases. In a high-speed range, the proportion of K2 is designed so as to become sufficiently greater than that of K1. In a low-speed range, the proportion of K1 is designed so as to become sufficiently greater than that of K2. Thereby, through use of a single algorithm there is performed control from a low-speed range to a high-speed range with little variation in torque.

This control method is based on the premise that no load is exerted on the motor. The method cannot be applied to a case where load imposed on the motor becomes heavier and where a deviation between the angle of the “d” axis and the angle of the γ axis is wide. If the angle of load is greater in this case, positive currents iγ* and iδθ* are caused to flow in the present embodiment, thereby pulling and constraining the “d” axis. By means of the above-described control operation being performed, good vector control can be expected over a range from a low-speed range to a high-speed range.

A third embodiment of the present invention will now be described by reference to the drawings.

BRIEF DESCRIPTION OF THE DRAWINGS

FIG. 4 is a block diagram showing a control system of a synchronous motor according to a third embodiment of the present invention;

FIG. 5 is a flowchart showing a discrete value system;

FIG. 6 is a flowchart showing a discrete value system according to another embodiment of the present invention; and

FIG. 7 is a waveform diagram showing a pattern of rise in current.

Reference numerals designate the following elements:

-   1 speed controller -   2 δ-axis current controller -   3 γ-axis current controller -   4 vector control circuit -   5 inverter circuit -   6 synchronous motor -   7 phase converter -   8 γ-δ-axis current/induced voltage estimator -   9 angular-speed deriving section -   11 γ-δ-axis position corrector -   12 γ-phase/δ-phase current corrector -   13 motor-constant identifier

According to a sensorless vector control method for a synchronous motor described in Japanese Patent Application Laid-Open No. 308286/1996, stator currents i_(g) and i_(b) converted into the γ-δ coordinate system set on the magnetic axis of the rotor, a difference between electric currents i_(gest) and i_(dest) estimated most recently, and voltage instructions v_(g) and v_(d) are entered. A current defined in the γ-δ coordinate system, the estimated current i_(dest), the induced voltages e_(gest) and e_(dest), and the speed ω_(rmest) of the rotor are estimated.

There are detected at least stator currents of two phases supplied to the synchronous motor at a point in time k·Ts seconds (where k=0, 1, 2, . . . , and Ts denotes a sampling time) according to the method. The electric currents are converted into the γ-δ-axis coordinate system set on the rotor, thereby deriving a γ-axis current i_(g)(k) and a δ-axis current i_(d)(k). Through use of the estimated γ-axis current i_(g)(k) and the estimated δ-axis i_(d)(k) that were derived most recently, and the voltages v_(g)(k) and v_(d)(k), the status formula pertaining to the γ-θ-axis coordinate system of the synchronous motor is developed to a discrete value system. $\begin{matrix} {{\frac{\mathbb{d}}{\mathbb{d}t}\begin{bmatrix} {i_{gest}\left( {k + 1} \right)} \\ {i_{dest}\left( {k + 1} \right)} \\ {ɛ_{Ygest}\left( {k + 1} \right)} \\ {ɛ_{dest}\left( {k + 1} \right)} \end{bmatrix}} = {\begin{bmatrix} {1 - {\frac{R_{s}}{L_{d}} \cdot T_{s}}} & {{\frac{L_{q}}{L_{d}} \cdot {\omega\quad}_{rm}}{(k) \cdot T_{s}}} & T_{s} & 0 \\ {{- \frac{L_{d}}{L_{q}}}{{\omega_{rm}(k)} \cdot T_{s}}} & {1 - {\frac{R_{s}}{L_{q}} \cdot T_{s}}} & 0 & T_{5} \\ 0 & 0 & 1 & 0 \\ 0 & 0 & 0 & 1 \end{bmatrix}{\quad{\begin{bmatrix} {i_{gest}(k)} \\ {i_{dest}(k)} \\ {ɛ_{gest}(k)} \\ {ɛ_{dest}(k)} \end{bmatrix} + {{T_{s}\begin{bmatrix} \frac{1}{L_{d}} & 0 \\ 0 & \frac{1}{L_{q}} \\ 0 & 0 \\ 0 & 0 \end{bmatrix}}\begin{bmatrix} {v_{Y}(k)} \\ {v_{\delta}(k)} \end{bmatrix}} + {{T_{s}\begin{bmatrix} k_{1} & k_{2} \\ k_{3} & k_{4} \\ k_{5} & k_{6} \\ k_{7} & k_{8} \end{bmatrix}}\begin{bmatrix} {i_{Y} - i_{gest}} \\ {i_{\delta} - i_{dest}} \end{bmatrix}}}}}} & (5) \end{matrix}$ wherein e_(gest)=−sin θe(ω rm/Lq)Φmag,

-   -   e_(dest)=cos θe(ω rm/Lq)Φmag,     -   Rs: resistance of stator, Lq: inductance of “q” axis;     -   Ld: inductance of d-axis     -   θe: deviation in angle between γ-δ axis and d-q axis, ω_(rm):         angular-speed of rotor,     -   Φmag: magnetic flux developing in permanent magnet. Thus, the         estimated currents i_(gest)(k+1) and i_(dest)(k+1) and the         estimated induced voltages e_(gest)(k+1) and e_(dest)(k+1) are         determined at time (k+1) seconds.

By means of formula (5), a δ-axis voltage/current equation is expressed as $\begin{matrix} {{i\quad{{dest}\left( {k + 1} \right)}} = {{i\quad{{dest}(k)}} + {\frac{Ts}{Lq} \cdot {{vd}(k)}} - {{\frac{{Ts} \cdot {Rs}}{Lq} \cdot i}\quad{{dest}(k)}} - {{\frac{{Ts} \cdot {Ld}}{Lq} \cdot \omega}\quad{{{rmest}(k)} \cdot i}\quad{{gest}(k)}} - {{\frac{Ts}{Lq} \cdot e}\quad{{{dest}(k)}.}}}} & (6) \end{matrix}$ In a steady state, i_(dest)(k+1)=i_(dest)(k), and hence there is derived $\begin{matrix} {{{\frac{Ts}{Lq} \cdot {{vd}(k)}} - {{\frac{{Ts} \cdot {Rs}}{Lq} \cdot i}\quad{{dest}(k)}} - {{\frac{{Ts} \cdot {Ld}}{Lq} \cdot \omega}\quad{{{rmest}(k)} \cdot i}\quad{{gest}(k)}} - {{\frac{Ts}{Lq} \cdot e}\quad{{dest}(k)}}} = 0.} & (7) \end{matrix}$

When no load is exerted on the motor, the δ-axis current i_(dest)(k) serving as a torque-component current becomes zero. At this time, the δ-axis voltage/current equation is expressed as $\begin{matrix} {{{\frac{Ts}{Lq} \cdot {{vd}(k)}} - {{\frac{{Ts} \cdot {Ld}}{Lq} \cdot \omega}\quad{{{rmest}(k)} \cdot i}\quad{{gest}(k)}} - {{\frac{Ts}{Lq} \cdot e}\quad{{dest}(k)}}} = 0.} & (8) \end{matrix}$ Here, the motor is controlled such that i g(k)=0, we have $\begin{matrix} {{{\frac{Ts}{Lq} \cdot {{vd}(k)}} - {{\frac{Ts}{Lq} \cdot e}\quad{{dest}(k)}}} = 0.} & (9) \end{matrix}$

Therefore, e_(dest)(k)=v_(d)(k), and the estimated induced voltage does not depend on the motor constant. An estimated speed determined when no correction is made to the estimated induced voltage is expressed as $\begin{matrix} {{\omega^{\prime}{{gest}(k)}} = {\frac{e\quad{{dest}(k)}}{Ke}.}} & (10) \end{matrix}$ Hence, the estimated speed is influenced by only an induced voltage constant.

Further, when compared with an estimated speed determined when a correction is made to the estimated induced voltage; that is, $\begin{matrix} {{{\omega\quad{{gest}(k)}} = \frac{\left\lbrack {{e\quad{{gest}(k)}^{2}} + {e\quad{{dest}(k)}^{2}}} \right\rbrack^{\frac{1}{2}}}{ke}},} & (11) \end{matrix}$ the induced voltage constant ke is tuned such that ω_(gest)(k)+α=ω_(gest′)(k) (α>0, the amount of α is now uncertain).

FIG. 4 is a block diagram showing a synchronous motor control system to which is applied a method of identifying resistance according to an embodiment of the present invention. FIG. 5 is a flowchart showing a digital control operation according to the method of identifying resistance.

As can be seen from the control system appearing in the block diagram shown in FIG. 4, an angular-speed instruction ω_(rm)* and an estimated angular-speed ω_(rm est) are input to the speed controller 1, and the speed controller 1 outputs a δ-axis current instruction iδ*. The δ-axis current controller 2 receives the δ-axis current instruction i_(d*) and the estimated δ-axis current i_(dest) and outputs a δ-axis voltage instruction V_(d*). A γ-axis current instruction i_(g*) and an estimated γ-axis current i_(gest) are input to the γ-axis current controller 3. The γ-axis current controller 3 outputs a γ-axis voltage instruction V_(g*). The position of the γ-δ axis output from the γ-δ-axis position corrector 11 and voltage instructions V_(d*) and V_(g*) are input to the vector control circuit 4. The absolute value (V_(d) ²+V_(g) ²)^(1/2) of a voltage and a phase tan⁻¹(V_(d)/V_(g)) from the γ-axis in a voltage-output direction are input to the inverter circuit 5, and a turn-on operation is implemented.

A γ-axis current i_(g) is produced as a result of a stator current i_(u) of the synchronous motor 6 passing through the phase converter 7. A δ-axis current i_(d) is produced as a result of a stator current i_(v) passing through the phase converter 7. The γ-phase current i_(g), the δ-phase current i_(d), the position of the γ-δ axis, and the voltage instructions V_(d*) and V_(g*) are input to the γ-δ-axis current/induced voltage estimator 8. By means of formula (5), the γ-δ-axis current/induced voltage estimator 8 outputs estimated γ-δ-axis currents i_(gest) and i_(dest) and induced γ-δ-axis voltages e_(gest) and e_(dest). The motor-constant identifier 13 outputs, to the γ-axis current controller 3, several types of γ-axis current instructions i_(g*). The motor-constant identifier 13 computes a resistance error ΔRs such that variation among estimated γ-axis induced voltages e_(gest) output from the γ-δ-axis current/induced voltage estimator 8 at that time approximate zero. The thus-computed resistance error is reported to the γ-δ-axis current/induced voltage estimator 8.

The flowchart shown in FIG. 5 shows processing of the motor-constant identifier 13 according to the present invention.

In the flowchart shown in FIG. 5, an operation is commenced at ω_(rm*) (step 110), and the motor awaits until there is achieved ω_(rm*)=ω_(rest) (step 10).

Next, the estimated δ-axis induced voltage e_(dest) is determined (step 120), and there is computed an estimated speed ω_(gest) which is defined by means of adding a correction to the estimated induced voltage (step 130).

Further, there is computed an estimated speed ω_(gest′) which is defined without addition of a correction to the estimated induced voltage (step 140).

Next, the amount of variation in estimated speed is computed (step 150), and an identification limit is determined in step 160.

In step 170, the induced voltage constant ke is adjusted. If variation in speed has achieved a target degree of accuracy, identification of an induced voltage constant is completed. In contrast, if variation in speed has not yet achieved a target degree of accuracy, processing pertaining to step 140 to processing pertaining to step 180 are iterated until a target degree of accuracy is achieved.

Formula (8) can be rewritten as v d(k)−Ld·ω rmest(k)·i gest(k)−e dest(k)=0  (12). However, an error ΔLd is included in the d-axis inductance Ld, so that formula (8) becomes v d(k)−Ld·ω rmest(k)·i gest(k)−ΔLd·ω rmest(k)·i gest(k)−e dest(k)−Δe dest(k)=0  (13).

Since not a real voltage but an instruction voltage_is used as v_(d)(k), formula (8) is defined as below, in consideration of an error Δv_(d) between a real voltage and an instruction voltage v d(k)−Δv d(k)−Ld·ω rmest(k)·i gest(k)−ΔLd·ω rmst(k)·i gest(k)−e dest(k)−Δe dest(k)=0  (14). Δe_(dest) for canceling ΔL_(d)·ω_(rmest)(k)·i_(gest) and Δv_(d) arises for satisfying formula (8), there stands e dest(k)=v d(k)−ΔLd·ω rmest(k)·i gest(k)  (15).

Provided that the synchronous motor is rotating at constant speed, formula (7) becomes a linear equation which includes ΔL_(d) as a slope and a voltage error Δv_(d) as an intercept. Through use of formula (11), a different current is caused to flow to the γ axis, and the resistance error L_(d) is controlled such that estimated δ-axis induced voltages e_(dest)(k) become equal to each other, thereby identifying the d-axis inductance of the synchronous motor.

FIG. 6 is a flowchart showing a digital control operation according to a method of identifying an induced voltage constant of a motor.

In the flowchart shown in FIG. 6, the current I_(g) is flowed to the γ axis for pulling the magnetic axis to the γ axis in accordance with a pattern shown in FIG. 7 (step 200). As shown in FIG. 7, the γ-axis current i_(g) is boosted at time T1, and the motor awaits for a period of time T2 until rotation becomes stable while a current is flowing through the motor (step 210). In another step, a current is caused to flow to the γ axis, and the motor awaits for a period of time T1 and a period of time T2 at the time of reading an estimated induced voltage, in much the same manner as mentioned previously.

A current i_(g1) is caused to flow to the γ axis (step 220), and an estimated δ-axis induced voltage ed1 is sought at that time (step 230).

An current i_(g2) is caused to flow to the γ axis (step 240), and an estimated γ-axis induced voltage e_(d2) is sought at that time (step 250).

By means of formula (15), an induced voltage constant is computed from the current i_(g1) determined in step 220, the current i_(g2) determined in step 240, and variation between the estimated δ-axis induced voltage e_(d1est) determined in step 230 when the γ-axis current instruction is changed and the estimated δ-axis induced voltage e_(d2est) determined in step 250 when the γ-axis current instruction is changed. The thus-computed induced voltage constant reflects the currently-set induced voltage constant (step 260). When the induced voltage constant has achieved a target degree of accuracy, identification of an induced voltage is completed. In contrast, if the induced voltage constant has not yet achieved a target degree of accuracy, processing pertaining to step 220 to processing pertaining to step 260 are iterated until a target s degree of accuracy is achieved.

Industrial Applicability

As has been described, the present invention enables excellent speed control of a synchronous motor even at low speed by means of a sensorless vector control method, by means of causing a positive current to flow to a γ axis, to thereby induce torque for constraining a magnetic axis “d.”

A phase at which a magnetic axis is pulled by means of control within a low-speed range is caused to lead the γ axis in accordance with the angle of load. Even if the angle of load becomes great, the γ axis serving as a control axis is aligned with a “d” axis serving as the magnetic axis of the synchronous motor, thereby enabling excellent transition of control to vector control.

According to the present invention, an estimated speed ω_(rmest′) which is not provided with a correction is computed from an axis induced voltage e_(dest) estimated by a γ-δ-axis current/induced voltage estimator. An induced voltage constant is identified such that the speed ω_(rmest′) becomes equal to the estimated speed ω_(rmest) to which a correction is made. Such a method is embodied as software, and hence parameters can be identified accurately at high speed, thereby enabling realization of control of a high-performance motor.

By utilization of variation in δ-axis induced voltages estimated by the γ-δ-axis current/induced voltage estimator, d-axis inductance of the synchronous motor is identified. Such a method is constructed in the form of software, thereby enabling high-speed and accurate identification of parameters. Thereby, control of a high-performance motor can be realized. 

1. A sensorless control method for a synchronous motor, comprising the steps of: taking a magnetic axis of the synchronous moto as a “δ” axis and taking an axis leading the δ axis by 90° C. as a “”axis; taking a coordinate γ-δ axis rotating at a synchronous motor rotation speed iδk and a specified magnetic axis of the synchronous electric motor as γ, and taking an axis leading γby 90° C. as δ, thereby setting a γ-δ axis rotation at a synchronous motor rotation instruction speed ω_(rm) taking a δ-axis direction current instruction iγ(k) and δ-axis direction current instruction iδ(k) as positive, thereby inducing torque for constraining maxnetic axis “δ”at an angle leading the γaxis; deriving a δ-axis direction current instruction by means of feedback control for multiplying, by gain, a variation between the synchronous motor rotation instruction speed ω_(rm) and an estimated speed ω_(rm) derived through disturbance observation, which observation is prepared by a δ-axis current formula and is taken as a synchronous motor induced voltage disturbance, adding, to the δ-axis direction current instruction, a variation angle correction instruction iδ(k) derived from an external observation by way of a proportional integration controller, the observation being prepared by a γ-axis current formula and being taken as a synchronous motor induced voltage disturbance; and aligning a γaxis rotating at instruction speed ω_(rm) with a real magnetic axis “d.”
 2. A method of identifying a constant of a controller of a synchronour motor which computes the speed of the motor from two-phase current supplied to the motor, the controller including a δ-axis speed controller for outputting a δ-axis current instruction on the basis of a signal reading to a variation between a speed instruction and the speed of the motor, a δ-axis current controller for computing a δ-axis voltage instruction from a δ-axis current instruction, a δ-axis current controller for computing a δ-axis voltage instruction from a δ-axis current instruction, a vector control circuit outputting the absolute value of a voltage instruction and the phase of the voltage instruction on the basis of the δ-axis voltage instruction and tye γ-axis voltage instruction, and an inverter circuit for supplying a drive current to the synchronous motor on the basis of the absolute value of a voltage instruction and the phase of the voltage instruction, the method comprising the steps of: setting an aαβ space coordinate system which takes a U phase of a rotor of the motor as an αaxis and has a βaxis leading from the αby an electric angle of 90° C. in the direction of forward rotation; assuming a γ-δaxis rotating at a synchronous motor rotation instruction speed ω_(rm) in the α-βspace coordinate system while taking a real magnetic axis of the synchronous motor as a “d” axis, taking an axis leading 90° C. from the “d” as a “q” axis, a coordinate d-q axis rotating at a sychronous motor rotation speed iδ(k) and a specified magnetic axis of the sychronous motor as a γ axis, and taking an axis leading the γ axis by 90° C. and a δ axis; and adjusting an induced voltage constant such that an estimated speed iδ(k) to which a correction is added so as to become equal to an estimates speed ω_(rm) to which no correction is added, through use of a synchronous motor induced voltage edest prepared by a δ-axis current formula taking a γ-δ axis current and a δ-axis voltage instruction iδθ* as inputs and taking a voltage induced in the synchronous motor as a disturbance, thereby identifying the induced voltage constant.
 3. The method of identifying a constant of a controller of a synchronous motor according to claim 3, wherein the method if embodied as software, and the software is installed in an inverter, thereby embedding means for accurately identifying a constant at high speed.
 4. A method of identifying a constrant of a synchronous motor which computes the speed of the motor from two-phase current supplied to the motor, the controller including a δ-axis speed controller for outputting a δ-axis current instruction on the basis of a signal relating to a variation between a speed instruction and the speed of the motor, a δ-axis current controller for computing a δ-axis voltage instruction from a δ-axis current instruction, a γ-axis current controller for computing a δ-axis voltage instruction from a γ-axis current instruction, a vector control circuit outputting the absolute value of a voltage instruction and the phase of the voltage instruction on the basis of the δ-axis voltage instruction and the γ-axis voltage instruction, and an inverter circuit for supplying a drive current to the synchronous motor on the basis of the absolute value of a voltage instruction and the phase of the voltage instruction, the method comprising steps of: setting an α-βspace coordinate system which take a U phase of a rotor of the motor as an αaxis and has a βaxis leading the αby an electric angle of 90° C. in the direction of forward rotation; setting a γ-δaxis rotating at a synchronous motor rotation instruction speed ω_(rm) in the α- βspace coordinate system while taking a real magnetic axis of the synchronous motor as a “d”axis, taking an axis leading 90° C. the “d”axis as a “q”axis, a coordinate d-q axis rotating at a synchronous motor rotation speed ω_(rm) and a specified magnetic axis of the synchronous motor as a γaxis, and taking an axis leading the γaxis by 90° C. as a δaxis; causing several different curents i_(g)* to flow toward the γthrough use of an estimated δ-axis induced voltage e_(dest)and a γ-axis current instruction i_(g)* which are prepared y a δ-axis current formula, the formula takin a γ-axis direction current i_(d)and a δ-axis voltage instruction v_(d)* as inputs and taking a δ-axis induced voltage e_(d)as a disturbance; and adjusting a d-axis inductance such that the estimated δ-axis induced voltages e_(dest)arising at the time become equal to each other, thereby identifying the d-axis inductance.
 5. The method of identifying a constant of a controller of a synchronous motor according to claim 5, wherein the method for identifying d-axis inductance of the synchronous motor is embodies as software, and the software is installed in an inverter, thereby embodying means for accurately identifying a constant at high speed. 